The monodromy pairing for logarithmic 1-motifs

TL;DR

This paper introduces a filtration on logarithmic abelian varieties and connects it to monodromy pairings across various cohomology theories, revealing deep links between logarithmic and algebraic geometry.

Contribution

It defines a new filtration on logarithmic abelian varieties and relates the obstruction to a bilinear pairing, unifying multiple cohomological realizations.

Findings

The filtration encodes monodromy data across p-adic, l-adic, and Betti cohomologies.

The pairing recovers the Picard-Lefschetz transformation for Jacobians.

The Hodge realization aligns with the monodromy weight filtration.

Abstract

We describe a 3-step filtration on all logarithmic abelian varieties with constant degeneration. The obstruction to descending this filtration, as a variegated extension, from logarithmic geometry to algebraic geometry is encoded in a bilinear pairing valued in the characteristic monoid of the base. This pairing is realized as the monodromy pairing in p-adic, l-adic, and Betti cohomolgies, and recovers the Picard-Lefschetz transformation in the case of Jacobians. The Hodge realization of the filtration is the monodromy weight filtration on the limit mixed Hodge structure.